本文给出了神经波方程的闭理想解法并且讨论了它的孤立子解。
This paper presents a closed ideal solution to the nerve wave equation and also discusses its soliton solution.
利用微分方程解的几何定性理论,直接得到该方程存在有限振幅的周期波与孤立波解的存在条件。
Conditions for the existence of solutions to periodic and isolated waves of limited amplitude are directly obtained based on qualitative geometric theory for ordinary differential equations.
首先通过变换关系和求解简单的常微分方程,得到了(3 + 1)维破裂孤子方程丰富的孤立波解和周期波解。
Many of the exact solutions of (3 + 1) dimensional breaking soliton equation are obtained by using a simple transformation relation and solving the ordinary differential equation.
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